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I have a logistic regression using glm and I would like to add a term of the form


where k and t are columns in a data frame, a is a constant. I would like R to find best-fit values for c1 and c2. Is this possible?

If I only wanted a fixed value, say c2 = 2,


I could just write

glm( model$y ~ I((model$k + 2*a)/(model$t + 2)) + model$otherterms,
  family = binomial(logit) )

which is similar to what I am doing now. But I don't think that 2 is optimal and iterating 'manually' is very time-consuming.

share|improve this question
look at the function nls – mnel Dec 19 '12 at 2:21
@mnel: How can I tell it that two of the parameters are equal? – Charles Dec 22 '12 at 21:23
up vote 2 down vote accepted

You can use function gnm from package gnm.

gnm(y~Mult(1, # c1
           offset(k)+1,# c3=a*c2 
           Inv(offset(t)+1)) # c2
           +other terms, 

EDIT (solution for constrained coefficients)

term_fun <- function(predLabels, varLabels){
                            "+",predLabels[2],"*3)/(", # a=3 for example
                            varLabels[2],"+", predLabels[3],")")}

  Ratio <- function(t,x){
   list(predictors = list(C1 = 1, C2 = 1),
        variables = list(substitute(t), substitute(x)),
        term = term_fun)
  class(Ratio) <- "nonlin"

  fit <- gnm(Y~Ratio(k,t), data=models, family=binomial)
share|improve this answer
How can I constrain c3 = a*c2 for a given value of a? For example, suppose a = 0.4. – Charles Dec 21 '12 at 23:39
In other words, the second and third constants aren't independent and need to be fixed multiples of each other; how can I achieve this? – Charles Dec 21 '12 at 23:41
I have added solution for constrained c3=a*c2. – Wojciech Sobala Jan 6 '13 at 20:54
That is awesome and complicated. Thank you, I don't think I ever would have come up with that. – Charles Jan 6 '13 at 21:14

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